Existence Conditions for Balanced Fractional 2mFactorial Designs of Resolution 2l + 1 Derived from Simple Arrays
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Publication:3462384
DOI10.1080/03610926.2013.788716zbMath1458.62174OpenAlexW1982664535MaRDI QIDQ3462384
Yoshifumi Hyodo, Masahide Kuwada, Hiromu Yumiba
Publication date: 5 January 2016
Published in: Communications in Statistics - Theory and Methods (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1080/03610926.2013.788716
Related Items (2)
Existence conditions for balanced fractional 3mfactorial designs of resolution R({00, 10, 01, 20, 11}) ⋮ On a lower bound for the number of assemblies in fractional \(2^m\) factorial designs of resolution \(2 \ell \)
Cites Work
- Characteristic polynomials of information matrices of some balanced fractional \(2^ m\) factorial designs of resolution \(2l+1\)
- Balanced arrays of strength 21 and balanced fractional \(2^m\) factorial designs
- Some general existence conditions for balanced arrays of strength \(t\) and 2 symbols
- Ga-Optimal Partially Balanced Fractional 2<sup><i>m</i><sub>1</sub>+<i>m</i><sub>2</sub></sup> Factorial Designs of Resolutions R({00,10,01,20,02} | Ω) and R({00,10,01,20,11} | Ω) with 2 ≤ <i>m</i><sub>1</sub>, <i>m</i><sub>2</sub> ≤ 4
- On the Characteristic Roots of the Information Matrix of $2^m$ Balanced Factorial Designs of Resolution V, with Applications
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